Small Mersenne Prime Factors (page 5050/5235)

Small Mersenne Prime Factors
Prime numbers of the form M_p= 2^p − 1 are called Mersenne primes. For M_p to be prime, p must also be prime.
Any factor q of a Mersenne number 2^p − 1 must be of the form 2kp + 1, where integer k ≥ 0. Furthermore, q must be 1 or 7 mod 8.

Exponent	Prime Factor	Dig.	Year
127231503719	254463007439	12	~2018
127236282163	1089...531529	15	2023
127246264031	254492528063	12	~2018
127252610603	254505221207	12	~2018
127258173803	254516347607	12	~2018
127265821499	254531642999	12	~2018
127269697873	763618187239	12	~2019
127272700319	254545400639	12	~2018
127279016159	254558032319	12	~2018
127285062413	3133...660807	15	2024
127294695191	254589390383	12	~2018
127297786559	254595573119	12	~2018
127298802503	254597605007	12	~2018
127301210951	254602421903	12	~2018
127303071419	254606142839	12	~2018
127326778643	254653557287	12	~2018
127336913243	254673826487	12	~2018
127338837959	254677675919	12	~2018
127354641731	254709283463	12	~2018
127365098831	254730197663	12	~2018
127372172881	764233037287	12	~2019
127372410433	764234462599	12	~2019
127374895619	254749791239	12	~2018
127377612617	764265675703	12	~2019
127378237271	254756474543	12	~2018

Exponent	Prime Factor	Dig.	Year
127381958003	254763916007	12	~2018
127388736851	254777473703	12	~2018
127410167411	254820334823	12	~2018
127444125661	764664753967	12	~2019
127450145881	764700875287	12	~2019
127451638019	254903276039	12	~2018
127462571591	254925143183	12	~2018
127468553819	254937107639	12	~2018
127470733163	254941466327	12	~2018
127477686491	254955372983	12	~2018
127496211383	254992422767	12	~2018
127502911379	255005822759	12	~2018
127509557183	255019114367	12	~2018
127511528101	765069168607	12	~2019
127513342031	255026684063	12	~2018
127516342357	765098054143	12	~2019
127520745851	255041491703	12	~2018
127520960459	255041920919	12	~2018
127528396763	255056793527	12	~2018
127530093539	255060187079	12	~2018
127533937691	255067875383	12	~2018
127546701959	255093403919	12	~2018
127551661619	255103323239	12	~2018
127553317043	255106634087	12	~2018
127569083123	255138166247	12	~2018

Exponent	Prime Factor	Dig.	Year
127593637133	765561822799	12	~2019
127606711283	255213422567	12	~2018
127614437771	255228875543	12	~2018
127614739691	255229479383	12	~2018
127620608639	255241217279	12	~2018
127630752659	255261505319	12	~2018
127635272951	255270545903	12	~2018
127642490471	255284980943	12	~2018
127646455679	255292911359	12	~2018
127651349993	765908099959	12	~2019
127652628721	765915772327	12	~2019
127654477451	255308954903	12	~2018
127657477393	765944864359	12	~2019
127662016673	765972100039	12	~2019
127672253341	766033520047	12	~2019
127679423533	766076541199	12	~2019
127681056539	255362113079	12	~2018
127684155239	255368310479	12	~2018
127702148159	255404296319	12	~2018
127703129231	255406258463	12	~2018
127711625887	3192...471751	14	2024
127713368291	255426736583	12	~2018
127722734939	255445469879	12	~2018
127727055437	766362332623	12	~2019
127730784491	255461568983	12	~2018

Exponent	Prime Factor	Dig.	Year
127743744301	766462465807	12	~2019
127745103719	255490207439	12	~2018
127745535551	255491071103	12	~2018
127746632171	255493264343	12	~2018
127750336691	255500673383	12	~2018
127759475639	255518951279	12	~2018
127802516651	255605033303	12	~2018
127803627431	255607254863	12	~2018
127808742371	255617484743	12	~2018
127815346943	255630693887	12	~2018
127830062219	255660124439	12	~2018
127831821203	255663642407	12	~2018
127838745389	8079...085849	14	2025
127843800233	767062801399	12	~2019
127849565579	255699131159	12	~2018
127849958063	255699916127	12	~2018
127854401651	255708803303	12	~2018
127860110723	255720221447	12	~2018
127867687151	255735374303	12	~2018
127879760159	255759520319	12	~2018
127888461443	255776922887	12	~2018
127890091739	255780183479	12	~2018
127897886183	255795772367	12	~2018
127905875843	255811751687	12	~2018
127910581499	255821162999	12	~2018

4.933.056 digits

25-07-20